2020
DOI: 10.1016/j.jde.2020.01.032
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Pathwise mild solutions for quasilinear stochastic partial differential equations

Abstract: Stochastic partial differential equations (SPDEs) have become a key modelling tool in applications. Yet, there are many classes of SPDEs, where the existence and regularity theory for solutions is not completely developed. Here we contribute to this aspect and prove the existence of mild solutions for a broad class of quasilinear Cauchy problems, includingamong others -cross-diffusion systems as a key application. Our solutions are local-in-time and are derived via a fixed point argument in suitable function s… Show more

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Cited by 23 publications
(38 citation statements)
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“…Assumption 3) represents a classical Lipschitz continuity, which can be weakened according to [123]. One can easily incorporate a locally Lipschitz drift term.…”
Section: The Quasilinear Casementioning
confidence: 99%
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“…Assumption 3) represents a classical Lipschitz continuity, which can be weakened according to [123]. One can easily incorporate a locally Lipschitz drift term.…”
Section: The Quasilinear Casementioning
confidence: 99%
“…In the nonautonomous case, one can also use the forward integral of Russo-Vallois [153] to define the convolution (2.18) and to construct a solution to the corresponding SPDE which coincides with the pathwise mild solution as argued in [151,Section 4.5]. The statement can be proved using fixed-point arguments as in [123]. This can be achieved in two steps.…”
Section: The Quasilinear Casementioning
confidence: 99%
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“…There are other solution concepts such as strong, kinetic [42], martingale [31], pathwise mild [106], or renormalized [71] solutions. Strong solutions rarely exist [148] due to the roughness of the noise.…”
Section: Spde Backgroundmentioning
confidence: 99%